Multiple Regression Power Analysis | SAS Data Analysis Examples

Introduction

Power analysis is the name given to the process for determining the sample size for a
research study. The technical definition of power is that it is the probability of
detecting a “true” effect when it exists. Many students think that there is a simple
formula for determining sample size for every research situation. However, the reality
it that there are many research situations that are so complex that they almost defy
rational power analysis. In most cases, power analysis involves a number of
simplifying assumptions, in order to make the problem tractable, and running the
analyses numerous times with different variations to cover all of the contingencies.

In this unit we will try to illustrate how to do a power analysis for multiple
regression model that has two control variables, one continuous research variable and
one categorical research variable (three levels).

Description of the Experiment

A school district is designing a multiple regression study looking at the effect of
gender, family income, mother’s education and language spoken in the home on the English
language proficiency scores of Latino high school students. The variables gender and
family income are control variables and not of primary research interest. Mother’s education
is a continuous research variable that measures the number of years that the mother attended
school. The range of this variable is expected to be from 4 to 20. The variable
language spoken in the home is a categorical research variable with three levels: 1) Spanish
only, 2) both Spanish and English, and 3) English only. Since there are three levels, it will
take two dummy variables to code language spoken in the home.

Thus, the primary research hypotheses are the test of b3 and the joint test of
b4 and b5. These tests are equivalent the testing the change in R2
when momeduc (or homelang1 & homelang2) are added last to the regression equation.

The Power Analysis

We will make use of the SAS proc power to do the power
analysis. To begin with, we believe, from previous research, that the R2 for the
full-model (r2f) with five predictor variables (2 control, 1 continuous research, and 2 dummy variables
for the categorical variable) will be will be about 0.48.

Let’s start with the continuous predictor (momeduc). We think that it will add about 0.03 to the
R2 when it is added last to the model. This means that the R2 for the model
without the variable (the reduced model) would be about 0.45, which leads to the
difference in R2 (rsquarediff) of .03. The total number of
variables (nfullpredictors) is 5 and the number being tested (ntestpredictors) is one. We will run
proc power for powers equal to .7, .8 and .9.

This gives us a range of sample sizes ranging from 110 to 185 depending on power.

Let’s see how this compares with the categorical predictor (homelang1 & homelang2)
which uses two dummy
variables in the model. We believe that the change in R2 attributed to the
two dummy variables will be about 0.025. This would give an R2 of 0.455. The
nfullpredictors stays at 5 while the ntestpredictors is now 2.

This series of power analyses yielded sample sizes ranging from 164 to 267. These sample
sizes are larger than those for the continuous research variable.

If it is the case that both of these research variables are important, we might want
to take into that we are testing two separate hypotheses (one for the continuous and one
for the categorical) by adjusting the alpha level. The simplest but most draconian
method would be to use a bonferroni adjustment by dividing the nominal alpha level, 0.05,
by the number of hypotheses, 2, yielding an alpha of 0.025. We will rerun the categorical
variable power analysis using the new adjusted alpha level.

The bonferroni adjustment assumes that the tests of the two hypotheses are independent which is,
in fact, not the case. The squared correlation between the two sets of predictors is about .2
which is equivalent to a correlation of approximately .45. Using an internet applet to compute
a bonferroni adjusted alpha taking into account the correlation gives us an adjusted alpha value
of 0.034 to use in the power analysis.

Based on the series of power analyses the school district has decided to collect data on a
sample of about 226 students. This sample size should yield a power of around 0.8 in testing
hypotheses concerning both the continuous research (momeduc) variable and the categorical
research variable language spoken in the home (homelang1 & homelang2). The nominal
alpha level is 0.05 but has been adjusted to .034 to take into account the number of
hypotheses tested and the correlation between the predictors.